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Question
If `(5^a * 125^a + 625^a)/(25^-b * 8^(1/3)) = 125`, show that 4a + 2b = 3.
Sum
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Solution
Rewrite everything in base 5:
- 125 = 53, 625 = 54, 25 = 52, 81/3 = 2
- 125a = 53a, 625a = 54a
Then
`(5^a * 125^a + 625^a)/(25^-b * 8^(1//3))`
= `(5^a * 5^(3a) + 5^(4a))/((5^2)^-b * 2)`
= `(5^(4a) + 5^(4a))/(2 * 5^(-2b))`
= `(2 * 5^(4a))/(2 * 5^(-2b))`
= `5^(4a) * 5^(2b)`
= `5^(4a + 2b)`
Given the value is 125 = 53, we get
`5^(4a + 2b) = 5^3`
Hence 4a + 2b = 3.
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